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Table of Contents
Introduction
1. Probability Theory.
1.1 Counting
1.2 Probability
1.3 Random Variables
1.4 Some Properties of Random Variables
1.5 Continuous Random Variables
1.6 Review Problems for Chapter 1
2. Statistical Inference.
2.1 Populations, Samples, and Statistics
2.2 Estimation
2.3 Hypothesis Testing
2.4 Some Properties of Hypothesis Tests
2.5 Some Comments on Nonparametric Statistics
2.6 Review Problems for Chapter 2
3. Some Tests Based on the Binomial Distribution.
3.1 The Binomial Test and Estimation of p
3.2 The Quantile Test and Estimation of xp
3.3 Tolerance Limits
3.4 The Sign Test
3.5 Some Variations of the Sign Test
4. Contingency Tables.
4.1 The 2 x 2 Contingency Table
4.2 The r x c Contingency Table
4.3 The Median Test
4.4 Measures of Dependence
4.5 The Chi Squared Goodness-of-Fit Test
4.6 Cochran's Test for Related Observations
4.7 Some Comments on Alternative Methods of Analysis
4.8 Review Problems for Chapters 3 and 4
5. Some Methods Based on Ranks.
5.1 Two Independent Samples
5.2 Several Independent Samples
5.3 A Test for Equal Variances
5.4 Measures for Rank Correlation
5.5 Nonparametric Linear Regression Methods
5.6 Methods for Monotonic Regression
5.7 The One-Sample or Matched-Pairs Case
5.8 Several Related Samples
5.9 The Balanced Incomplete Block Design
5.10 Tests with A.R.E. of 1 or More
5.11 Fisher's Method of Randomization
5.12 Some Comments on the Rank Transformation
5.13 Review Problems for Chapter 5
6. Statistics of the Kolmogorov-Smirnov Type.
6.1 The Kolmogorov Goodness-of-Fit Test
6.2 Goodness-of-Fit Tests for Families of Distributions
6.3 Tests on Two Independent Samples
6.4 Review Problems for Chapters 1 through 6
References.
Appendix Tables.
Answers to Odd-Numbered Exercises.
Index.